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Splash Screen. Five-Minute Check (over Lesson 6–1) Then/Now New Vocabulary Theorems: Properties of Parallelograms Proof: Theorem 6.4 Example 1: Real-World Example: Use Properties of Parallelograms Theorems: Diagonals of Parallelograms
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Five-Minute Check (over Lesson 6–1) Then/Now New Vocabulary Theorems: Properties of Parallelograms Proof: Theorem 6.4 Example 1: Real-World Example: Use Properties of Parallelograms Theorems: Diagonals of Parallelograms Example 2: Use Properties of Parallelograms and Algebra Example 3: Parallelograms and Coordinate Geometry Example 4: Proofs Using the Properties of Parallelograms Lesson Menu
A B C D Find the measure of an interior angle of a regular polygon that has 10 sides. A. 180 B. 162 C. 144 D. 126 5-Minute Check 1
A B C D Find the measure of an interior angle of a regular polygon that has 12 sides. A. 135 B. 150 C. 165 D. 180 5-Minute Check 2
A B C D What is the sum of the measures of the interior angles of a 20-gon? A. 3600 B. 3420 C. 3240 D. 3060 5-Minute Check 3
A B C D What is the sum of the measures of the interior angles of a 16-gon? A. 3060 B. 2880 C. 2700 D. 2520 5-Minute Check 4
A B C D Find x if QRSTU is a regular pentagon. A. 21 B. 15.25 C. 12 D. 10 5-Minute Check 5
A B C D What type of regular polygon has interior angles with a measure of 135°? A. pentagon B. hexagon C. octagon D. decagon 5-Minute Check 6
You classified polygons with four sides as quadrilaterals. (Lesson 1–6) • Recognize and apply properties of the sides and angles of parallelograms. • Recognize and apply properties of the diagonals of parallelograms. Then/Now
parallelogram Vocabulary
A. CONSTRUCTION In suppose mB = 32, CD = 80 inches, BC = 15 inches. Find AD. Use Properties of Parallelograms Example 1A
AD = BC Opposite sides of a are . Use Properties of Parallelograms = 15 Substitution Answer:AD = 15 inches Example 1
B. CONSTRUCTION In suppose mB = 32, CD = 80 inches, BC = 15 inches. Find mC. Use Properties of Parallelograms Example 1B
mC + mB = 180 Cons. s in a are supplementary. Use Properties of Parallelograms mC + 32= 180 Substitution mC = 148 Subtract 32 from each side. Answer:mC = 148 Example 1
C. CONSTRUCTION In suppose mB = 32, CD = 80 inches, BC = 15 inches. Find mD. Use Properties of Parallelograms Example 1C
mD = mB Opp. s of a are . Use Properties of Parallelograms = 32 Substitution Answer:mD = 32 Example 1
A B C D A. ABCD is a parallelogram. Find AB. A. 10 B. 20 C. 30 D. 50 Example 1A
A B C D B. ABCD is a parallelogram. Find mC. A. 36 B. 54 C. 144 D. 154 Example 1B
A B C D C. ABCD is a parallelogram. Find mD. A. 36 B. 54 C. 144 D. 154 Example 1C
Use Properties of Parallelograms and Algebra A. If WXYZ is a parallelogram, find the value of r. Opposite sides of a parallelogram are . Definition of congruence Substitution Divide each side by 4. Answer:r = 4.5 Example 2A
8s = 7s + 3 Diagonals of a bisect each other. Use Properties of Parallelograms and Algebra B. If WXYZ is a parallelogram, find the value of s. s = 3 Subtract 7s from each side. Answer:s = 3 Example 2B
Use Properties of Parallelograms and Algebra C. If WXYZ is a parallelogram, find the value of t. ΔWXY ΔYZW Diagonal separates a parallelogram into 2 triangles. YWX WYZ CPCTC mYWX= mWYZ Def of congruence 2t =18 Substitution t=9 Divide each side by 2. Example 2C
A B C D A. If ABCD is a parallelogram, find the value of x. A. 2 B. 3 C. 5 D. 7 Example 2A
A B C D B. If ABCD is a parallelogram, find the value of p. A. 4 B. 8 C. 10 D. 11 Example 2B
A B C D C. If ABCD is a parallelogram, find the value of k. A. 4 B. 5 C. 6 D. 7 Example 2C
Midpoint Formula Find the midpoint of Since the diagonals of a parallelogram bisect each other, the intersection point is the midpoint of Parallelograms and Coordinate Geometry What are the coordinates of the intersection of the diagonals of parallelogram MNPR, with vertices M(–3, 0), N(–1, 3), P(5, 4), and R(3, 1)? Example 3
Parallelograms and Coordinate Geometry Answer: The coordinates of the intersection of the diagonals of parallelogram MNPR are (1, 2). Example 3
A B C D A. B. C. D. What are the coordinates of the intersection of the diagonals of parallelogram LMNO, with verticesL(0, –3), M(–2, 1), N(1, 5), O(3, 1)? Example 3
A B C D Given:LMNO, LN and MO are diagonals and point Q is the intersection of LN and MO. A.LO MN B.LM║NO C.OQ QM D.Q is the midpoint of LN. To complete the proof below, which of the following is relevant information? Prove:LNO NLM Example 4